Local Semicircle law and Gaussian fluctuation for Hermite β ensemble

Abstract

Let β>0 and consider an n-point process λ1, λ2,..., λn from Hermite β ensemble on the real line R. Dumitriu and Edelman discovered a tri-diagonal matrix model and established the global Wigner semicircle law for normalized empirical measures. In this paper we prove that the average number of states in a small interval in the bulk converges in probability when the length of the interval is larger than n, i.e., local semicircle law holds. And the number of positive states in (0,∞) is proved to fluctuate normally around its mean n/2 with variance like n/π2β. The proofs rely largely on the way invented by Valko and Virag of counting states in any interval and the classical martingale argument.